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International Mathematics Competition
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IMC 2024 |
| Information | Results | Problems & Solutions |
IMC2015: Day 1, Problem 2
2. For a positive integer $n$, let $f(n)$ be the number obtained by writing $n$ in binary and replacing every 0 with 1 and vice versa. For example, $n=23$ is 10111 in binary, so $f(n)$ is 1000 in binary, therefore $f(23) =8$. Prove that \[\sum_{k=1}^n f(k) \leq \frac{n^2}{4}.\] When does equality hold?
Proposed by Stephan Wagner, Stellenbosch University
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